Simultaneous confidence bands for Yule-Walker estimators and order selection

Abstract

Let \Xk,k∈Z\ be an autoregressive process of order q. Various estimators for the order q and the parameters q=(θ1,...,θq)T are known; the order is usually determined with Akaike's criterion or related modifications, whereas Yule-Walker, Burger or maximum likelihood estimators are used for the parameters q. In this paper, we establish simultaneous confidence bands for the Yule--Walker estimators θi; more precisely, it is shown that the limiting distribution of 1≤ i≤ dn|θi-θi| is the Gumbel-type distribution e-e-z, where q∈\0,...,dn\ and dn= O(nδ), δ >0. This allows to modify some of the currently used criteria (AIC, BIC, HQC, SIC), but also yields a new class of consistent estimators for the order q. These estimators seem to have some potential, since they outperform most of the previously mentioned criteria in a small simulation study. In particular, if some of the parameters \θi\1≤ i≤ dn are zero or close to zero, a significant improvement can be observed. As a byproduct, it is shown that BIC, HQC and SIC are consistent for q∈\0,...,dn\ where dn= O(nδ).